Tuesday, May 21, 2013

An Unheralded Breakthrough: The Rosetta Stone of Mathematics

An Unheralded Breakthrough: The Rosetta Stone of Mathematics: There is no Nobel Prize in mathematics, but in 2001 the Norwegian government established a million-dollar Abel Prize, which is widely considered as an equivalent of the Nobel for mathematicians. This year's prize was awarded to Pierre Deligne, professor emeritus at the Institute for Advanced Study in Princeton, N.J. Today, he is honored at a ceremony held in Oslo.Deligne's most spectacular results are on the interface of two areas of mathematics: number theory and geometry. At first glance, the two subjects appear to be light-years apart. As the name suggests, number theory is the study of numbers, such as the familiar natural numbers (1, 2, 3, and so on) and fractions, or more exotic ones, such as the square root of two. Geometry, on the other hand, studies shapes, such as the sphere or the surface of a donut. But French mathematician Andr? Weil had a penetrating insight that the two subjects are in fact closely related. In 1940, while Weil was imprisoned for refusing to serve in the army during World War II, he sent a letter to his sister Simone Weil, a noted philosopher, in which he articulated his vision of a mathematical Rosetta stone. Weil suggested that sentences written in the language of number theory could be translated into the language of geometry, and vice versa. "Nothing is more fertile than these illicit liaisons," he wrote to his sister about the unexpected links he uncovered between the two subjects; "nothing gives more pleasure to the connoisseur." And the key to his groundbreaking idea was something we encounter everyday when we look at the clock. [More]